Saved in:
Bibliographic Details
Main Authors: Miyauchi, Atsushi, Adriaens, Florian, Bonchi, Francesco, Tatti, Nikolaj
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2404.16676
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866910235343454208
author Miyauchi, Atsushi
Adriaens, Florian
Bonchi, Francesco
Tatti, Nikolaj
author_facet Miyauchi, Atsushi
Adriaens, Florian
Bonchi, Francesco
Tatti, Nikolaj
contents We establish Multilayer Correlation Clustering, a novel generalization of Correlation Clustering to the multilayer setting. In this model, we are given a series of inputs of Correlation Clustering (called layers) over the common set $V$ of $n$ elements. The goal is to find a clustering of $V$ that minimizes the $\ell_p$-norm ($p\geq 1$) of the multilayer-disagreements vector, which is defined as the vector (with dimension equal to the number of layers), each element of which represents the disagreements of the clustering on the corresponding layer. For this generalization, we first design an $O(L\log n)$-approximation algorithm, where $L$ is the number of layers. We then study an important special case of our problem, namely the problem with the so-called probability constraint. For this case, we first give an $(α+2)$-approximation algorithm, where $α$ is any possible approximation ratio for the single-layer counterpart. Furthermore, we design a $4$-approximation algorithm, which improves the above approximation ratio of $α+2=4.5$ for the general probability-constraint case. Computational experiments using real-world datasets support our theoretical findings and demonstrate the practical effectiveness of our proposed algorithms.
format Preprint
id arxiv_https___arxiv_org_abs_2404_16676
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Multilayer Correlation Clustering
Miyauchi, Atsushi
Adriaens, Florian
Bonchi, Francesco
Tatti, Nikolaj
Data Structures and Algorithms
Machine Learning
We establish Multilayer Correlation Clustering, a novel generalization of Correlation Clustering to the multilayer setting. In this model, we are given a series of inputs of Correlation Clustering (called layers) over the common set $V$ of $n$ elements. The goal is to find a clustering of $V$ that minimizes the $\ell_p$-norm ($p\geq 1$) of the multilayer-disagreements vector, which is defined as the vector (with dimension equal to the number of layers), each element of which represents the disagreements of the clustering on the corresponding layer. For this generalization, we first design an $O(L\log n)$-approximation algorithm, where $L$ is the number of layers. We then study an important special case of our problem, namely the problem with the so-called probability constraint. For this case, we first give an $(α+2)$-approximation algorithm, where $α$ is any possible approximation ratio for the single-layer counterpart. Furthermore, we design a $4$-approximation algorithm, which improves the above approximation ratio of $α+2=4.5$ for the general probability-constraint case. Computational experiments using real-world datasets support our theoretical findings and demonstrate the practical effectiveness of our proposed algorithms.
title Multilayer Correlation Clustering
topic Data Structures and Algorithms
Machine Learning
url https://arxiv.org/abs/2404.16676